Mathematical Logic

Program

• Propositional logic: language, deduction system, semantics, soundness, completeness;
• First-order logic: syntax, semantics, soundness, completeness, compactness;
• Set theory: fundamental axioms, ordinals, cardinals, transfinite induction, axiom of choice, continuum hypothesis;
• Computability: computable functions, λ-calculi, simple theory of types;
• Constructive mathematics: intuitionistic logic, propositions as types, normalisation;
• Limiting results: Peano arithmetic, Gödel’s incompleteness theorems, natural incompleteness results.

The slides of the course are available: select the right academic year

• 2020/21
• 2019/20
• 2018/19
• 2017/18
• 2016/17
• 2015/16

Here are some exercises on natural deduction.
The official online course is available: please carefully read the introductory notes!

The non-official videos are available in the video page.
Note that this course on YouTube differs from the online course!

Assignments

date	text	solution
7 nov 2016	pdf	pdf
5 dec 2016	pdf	pdf
16/17 jan 2017	pdf	pdf
1 feb 2017	pdf	pdf
23 mar 2018	pdf	pdf
2 may 2018	pdf	pdf
25 may 2018	pdf	pdf
8 jun 2018	pdf	pdf
31 oct 2018	pdf	pdf
28 nov 2018	pdf	pdf
10 jan 2019	pdf	pdf
5 feb 2019	pdf	pdf
24 oct 2019	pdf	pdf
27 nov 2019	pdf	pdf
10 jan 2020	pdf	pdf
28 jan 2020	pdf	pdf
9 apr 2021	pdf	pdf
30 apr 2021	pdf	pdf
28 may 2021	pdf	pdf
15 june 2021	pdf	pdf

Results

Surname	Name	1st	2nd	3rd	4th	Final
Te (2019/2020)	G	30	32	19	30	28
A	F	36	36	29	36	30 e lode
B	M	32	28	27	35	30 e lode
Ca	C	30	31	17	36	29
Cl	C	26	34	33	36	30 e lode
DZ	G	36	34	31	36	30 e lode
DP	G	36	36	30	36	30 e lode
D	G	26	32	19	36	28
F	S	34	34	29	32	30 e lode
F	A	36	36	33	35	30 e lode
G	F	36	34	26	36	30 e lode
M	F	36	36	34	35	30 e lode
P	R	23	33	29	34	30
R	M	24	36	22	36	30
S	S	28	36	34	32	30 e lode
V	M	32	35	30	35	30 e lode
V	S	36	36	30	35	30 e lode